Multivariate Alexander quandles, II. The involutory medial quandle of a link (corrected)

Abstract

Joyce showed that for a classical knot K, the involutory medial quandle IMQ(K) is isomorphic to the core quandle of the homology group H1(X2), where X2 is the cyclic double cover of S 3, branched over K. It follows that |IMQ(K)| = | K |. In the present paper, the extension of Joyce's result to classical links is discussed. Among other things, we show that for a classical link L of μ ≥ 2 components, the order of the involutory medial quandle is bounded as follows: \[ μ | L |2 ≥ |IMQ(L)| ≥ μ | L | 2μ -1. \] In particular, IMQ(L) is infinite if and only if L =0. We also show that in general, IMQ(L) is a strictly stronger invariant than H1(X2). That is, if L and L' are links with IMQ(L) IMQ(L'), then H1(X2) H1(X'2); but it is possible to have H1(X2) H1(X'2) and IMQ(L) IMQ(L'). In fact, it is possible to have X2 X'2 and IMQ(L) IMQ(L').